One-Way Functions and Polynomial Time Dimension
Abstract
This paper demonstrates a duality between the non-robustness of polynomial time dimension and the existence of one-way functions. Polynomial-time dimension (denoted ) quantifies the density of information of infinite sequences using polynomial time betting algorithms called -gales. An alternate quantification of the notion of polynomial time density of information is using polynomial-time Kolmogorov complexity rate (denoted ). Hitchcock and Vinodchandran (CCC 2004) showed that is always greater than or equal to . We first show that if one-way functions exist then there exists a polynomial-time samplable distribution with respect to which and are separated by a uniform gap with probability . Conversely, we show that if there exists such a polynomial-time samplable distribution, then (infinitely-often) one-way functions exist. Using our main results, we solve a long standing open problem posed by Hitchcock and Vinodchandran (CCC 2004) and Stull under the assumption that one-way functions exist. We demonstrate that if one-way functions exist, then there are individual sequences whose poly-time dimension strictly exceeds , that is . Further, we show that the gap between these quantities can be made as large as possible (i.e. close to 1). We also establish similar bounds for strong poly-time dimension versus asymptotic upper Kolmogorov complexity rates.
Cite
@article{arxiv.2411.02392,
title = {One-Way Functions and Polynomial Time Dimension},
author = {Satyadev Nandakumar and Subin Pulari and Akhil S and Suronjona Sarma},
journal= {arXiv preprint arXiv:2411.02392},
year = {2025}
}